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There are n bins and m balls. Balls are with different weights, say ball i has weight w_i. Is there an algorithm that assigns balls into x<n bins so that maximal load of these bins is minimized.

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closed as off topic by Lasse V. Karlsen Jun 28 '11 at 14:43

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...such that...? – Aasmund Eldhuset Jun 28 '11 at 14:35
This question belongs on cstheory.stackexchange.com, but there are already plenty of packing questions there, so I won't migrate it. Instead, I will close it as off-topic, and kindly ask you to review the questions already on that site, and see if any of them happens to answer your question. Here's a search link: cstheory.stackexchange.com/search?q=packing – Lasse V. Karlsen Jun 28 '11 at 14:43

This is equivalent to the multiprocessor scheduling problem, which is NP-complete. In other words: algorithm(s) exist, but they are very slow.

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Aasmund pretty much gets this one. – Colin Aug 2 '11 at 14:05

This is a disguised hash function question. i.e. You are looking for an optimal hash function. Check out this page - http://en.wikipedia.org/wiki/Hash_function

Generally you want a random key that you can XOR with w_i then take the result mod n to get the bin number.

Note: I took maximal load to mean number of balls per bin. Hashing of course does not work if you want to minimize the weight of each bin.

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He's not interested in an even distribution of the number of balls (which is what an optimal hash function would give), but an even distribution of the weight. – Aasmund Eldhuset Jun 28 '11 at 14:46
I believe you’re wrong, Aasmund has the correct answer. I don’t see how this problem relates to hashing except for the fact that of course the resulting mapping can be expressed as a hash function (but that’s trivial, and not very interesting). – Konrad Rudolph Jun 28 '11 at 14:47
btw - We haven't actually 'solved' the problem, but optimal solutions to np-complete problems are fairly easy to describe; run through every possible combination of balls to bins and see which gives the best result :-) – Colin Jun 28 '11 at 15:54

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